Exploring Tangents and Radii in Circles

The line intersects the circle at exactly one point.

The line intersects the circle at two points.

The line is parallel to the circle's radius.

The line is inside the circle.

Because line AC is tangent to circle O at C.

Because line AC is parallel to OC.

Because OC is the longest side of the triangle.

Because AOC is an equilateral triangle.

It is parallel to the radius.

It intersects the radius at a 45-degree angle.

It bisects the radius.

It is perpendicular to the radius.

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2 units

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By calculating the area of triangle AOC.

By applying the Pythagorean theorem.

By measuring the diameter of circle O.

By using the circumference of circle O.

The length of segment AB.

The area of circle O.

The diameter of circle O.

The circumference of circle O.

AC^2 + OC^2 = AO^2

AC^2 = OC^2 + AO^2

AC^2 + AO^2 = OC^2

OC^2 + AO^2 = AC^2

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5 units

AC^2 = 25 - 3

AC^2 + 9 = 25

AC^2 = 25 + 9

AC^2 + 3 = 25